Proof of Nuprl Lemma : eu-cong-angle-symm2

Step * 1 1 1 of Lemma eu-cong-angle-symm2

1. e : EuclideanPlane@i'
2. a : Point@i
3. b : Point@i
4. c : Point@i
5. x : Point@i
6. y : Point@i
7. z : Point@i
8. (¬(x = y ∈ Point))
∧ (¬(z = y ∈ Point))
∧ (¬(a = b ∈ Point))
∧ (¬(c = b ∈ Point))

∧ (∃a',c',x',z':Point. (y_x_a' ∧ y_z_c' ∧ b_a_x' ∧ b_c_z' ∧ ya'=bx' ∧ yc'=bz' ∧ a'c'=x'z'))@i

⊢ (¬(a = b ∈ Point))
∧ (¬(c = b ∈ Point))
∧ (¬(x = y ∈ Point))
∧ (¬(z = y ∈ Point))

∧ (∃a',c',x',z':Point. (b_a_a' ∧ b_c_c' ∧ y_x_x' ∧ y_z_z' ∧ ba'=yx' ∧ bc'=yz' ∧ a'c'=x'z'))

BY
{ D 8 }

1
1. e : EuclideanPlane@i'
2. a : Point@i
3. b : Point@i
4. c : Point@i
5. x : Point@i
6. y : Point@i
7. z : Point@i
8. ¬(x = y ∈ Point)@i
9. (¬(z = y ∈ Point))
∧ (¬(a = b ∈ Point))
∧ (¬(c = b ∈ Point))

∧ (∃a',c',x',z':Point. (y_x_a' ∧ y_z_c' ∧ b_a_x' ∧ b_c_z' ∧ ya'=bx' ∧ yc'=bz' ∧ a'c'=x'z'))@i

⊢ (¬(a = b ∈ Point))
∧ (¬(c = b ∈ Point))
∧ (¬(x = y ∈ Point))
∧ (¬(z = y ∈ Point))

∧ (∃a',c',x',z':Point. (b_a_a' ∧ b_c_c' ∧ y_x_x' ∧ y_z_z' ∧ ba'=yx' ∧ bc'=yz' ∧ a'c'=x'z'))

Latex:

Latex:
1. e : EuclideanPlane@i' 2. a : Point@i 3. b : Point@i 4. c : Point@i 5. x : Point@i 6. y : Point@i 7. z : Point@i 8. (\mneg{}(x = y)) \mwedge{} (\mneg{}(z = y)) \mwedge{} (\mneg{}(a = b)) \mwedge{} (\mneg{}(c = b)) \mwedge{} (\mexists{}a',c',x',z':Point. (y\_x\_a' \mwedge{} y\_z\_c' \mwedge{} b\_a\_x' \mwedge{} b\_c\_z' \mwedge{} ya'=bx' \mwedge{} yc'=bz' \mwedge{} a'c'=x'z'))@i \mvdash{} (\mneg{}(a = b)) \mwedge{} (\mneg{}(c = b)) \mwedge{} (\mneg{}(x = y)) \mwedge{} (\mneg{}(z = y)) \mwedge{} (\mexists{}a',c',x',z':Point. (b\_a\_a' \mwedge{} b\_c\_c' \mwedge{} y\_x\_x' \mwedge{} y\_z\_z' \mwedge{} ba'=yx' \mwedge{} bc'=yz' \mwedge{} a'c'=x'z')) By Latex: D 8 Home Index